module 31: anova for factorial designs
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Module 31: ANOVA for Factorial Designs
This module discusses analyses for factorial designs.
Reviewed 19 July 05/MODULE 31: ANOVA for Factorial Designs
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Factorial Designs
Factorial designs include two or more factors, each having more than one level or treatment. Participants typically are randomized to a combination that includes one treatment or level from each factor.
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Treatment Combinations
Treatment combinations and the ability to assess interaction are the essence of factorial designs.
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Drug and Exercise Factorial Example
In this two factor example, participants received one of four drugs and also participated in one of four exercise programs. Hence, each factor has four levels and there are 16 treatment combinations altogether. Three participants were assigned to each of the 16 treatment combinations, so that a total of n = 48 participants were involved.
An activity intensity score was recorded for each participant.
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Activity response score Type of Exercise
Drug A B C D Total 4 2 9 3
1 3 2 7 4 7 1 3 3
Total 14 5 19 10 48 2 5 5 5
2 4 3 2 4 6 7 3 7
Total 12 15 10 16 53 3 4 7 9
3 6 8 5 5 5 5 4 6
Total 14 17 16 20 67 2 9 4 9
4 2 4 6 5 3 5 5 8
Total 7 18 15 22 62 Overall 47 55 60 68 230
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This design permits an assessment of the presence of interaction between the two factors and, if no interaction is present, of the effect of the different levels of exercise and of the different drugs.
The design is more efficient than two separate studies, one for each of the two factors.
Advantage of Factorial Designs
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Essence of Interaction
Interaction is present when the differences between the levels for one factor are different for the different levels of the other factor. That is, when differences are different.
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No Interaction Between Exercise and Drug
0
2
4
6
8
10
12
A B C D
Exercise
Inte
nsi
ty
Drug 1 Drug 2 Drug 3 Drug 4
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Subtle Interaction
0.0
5.0
10.0
15.0
20.0
25.0
30.0
A B C D
Exercise
Inte
nsi
ty
Drug 1 Drug 2 Drug 3 Drug 4
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Dramatic Interaction
0.0
1.0
2.0
3.0
4.0
5.0
6.0
7.0
8.0
A B C DExercise
Inte
nsi
ty
Drug 1 Drug 2 Drug 3 Drug 4
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Interaction from Example
0.00
1.00
2.00
3.00
4.00
5.00
6.00
7.00
8.00
A B C D
Exercise
Inte
nsi
ty
Drug 1 Drug 2 Drug 3 Drug 4
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Hypotheses to Test
First, test:
H0: No Interaction
If this hypothesis is not rejected, then test:
H0: No Exercise effect, and
H0: No Drug effect
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If the null hypothesis of no interaction is rejected, then a test for overall drug effect or overall exercise effect has no meaning. Under these circumstances, these tests should not be done; however, it is likely to be insightful to examine the patterns of interaction between the two factors.
When There is Interaction
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Hypothesis Testing
1. The hypotheses:
First test:
H0: No Interaction
Then, if there is no interaction, test:
H0: No Exercise effect, and
H0: No Drug effect
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2. The Assumptions:
Independent random samples, normal distributions, equal variances
3. The α level:
= 0.05
4. and 5. Test Statistic and Rejection Region
See ANOVA table
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6. The Test Result:
ANOVA as shown in the following slides
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Activity response score Type of Exercise
Drug A B C D Total 4 2 9 3
1 3 2 7 4 7 1 3 3
Total 14 5 19 10 48 2 5 5 5
2 4 3 2 4 6 7 3 7
Total 12 15 10 16 53 3 4 7 9
3 6 8 5 5 5 5 4 6
Total 14 17 16 20 67 2 9 4 9
4 2 4 6 5 3 5 5 8
Total 7 18 15 22 62 Overall 47 55 60 68 230
Note: 2302/48 = 1,102.08
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SS(Total)
SS(Total) = 1,316 – 1,102.08 = 213.92
Note: 2302/48 = 1,102.08
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SS(Treatment Combinations)
The next step is to prepare the following table showing the sums for each of the 16 treatment combinations. Also shown are the factor level means.
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More for SS(Treatment Combinations)
SS(Treatment Combinations) = 1,210.00 – 1,102.08
= 107.92
We will call this SS(Treatments) afterward to save space.
Note: 2302/48 = 1,102.08
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SS(Within Cells)
SS(Within Cells) = SS(Total) - SS(Treatments)
= 213.92 – 107.92
= 106.00
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SS(Exercise)
SS(Exercise) = 1,121.50 – 1,102.08 = 19.42
Note: 2302/48 = 1,102.08
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SS(Drugs)
SS(Drugs) = 1,120.50 – 1,102.08 = 18.42
Note: 2302/48 = 1,102.08
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SS(Drug x Exercise Interaction)
SS(Interaction) = SS(Treatments) – SS(Drugs)
– SS(Exercise)
= 107.92 – 18.42 – 19.42
= 70.08
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F(Interaction) = 7.79/3.31 = 2.35 F0.95(9, 32) = 2.19
F(Exercise) = 6.47/3.31 = 1.95 F0.95(3, 32) = 2.90
F(Drugs) = 6.14/3.31 = 1.85 F0.95(3, 32) = 2.90
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7. The Conclusion:
Reject H0: No Interaction since the F statistic calculated from the ANOVA table, F = 2.35 exceeds F0.95(9, 32) = 2.18
Do not test the other two hypotheses.
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Variations and Review
The following slides present three different designs, but use the same data. This is done for the dual purpose of reviewing the different types of ANOVA we have discussed, while also showing their relationship to each other.
The data are an activity intensity score.
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Variation 1: One-Way ANOVA
SS(Drugs) = 212/6 +342/6 + 422/6 – 972/18
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F(Drugs) = 6.26 F0.95(2, 15) = 3.68
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Variation 2: Randomized Blocks, Simple Repeated Measures
SS(Drugs) = 212/6 +342/6 + 422/6 – 972/18
SS(Persons) = 202/3 +192/3 + + 172/3 – 972/18
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F(Drugs) = 6.41 F0.95(2, 10) = 4.10
F(Persons) = 1.07 F0.95(5, 10) = 3.33
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Variation 3: Factorial Design
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F(Interaction) = 1.12 F0.95(4, 9) = 3.63
F(Drugs) = 8.22 F0.95(2, 9) = 4.26
F(Exercise) = 3.10 F0.95(2, 9) = 4.26
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